Ask questions and get helpful responses.
Ask a New Question
  1. Questions

Precalculus

Suppose H(X)=(6x-5)^3
Find two functions f and g such that (f•g)(x)=H(x)
Neither function can be the parent/ identity function

  1. 👍
  2. 👎
  3. 👁
  4. ℹ️
  5. 🚩
Alan

  1. f(x) = x^3
    g(x) = 6x-5

    h(x) = f(g(x)) = g^3 = (6x-5)^3

    1. 👍
    2. 👎
    3. ℹ️
    4. 🚩
    Steve

Respond to this Question

First Name

Your Response

Similar Questions

  1. Algebra

    Suppose H(x)=(sqrt5x+3). Find two functions f and g such that (fog)(x)= H(x) . f(x)= g(x)= Neither function can be the identity function. (There may be more than one correct answer.)

  2. Precalculus

    Suppose H(X)=(3-7x)^6 Find two functions f and g such that (f•g)(x)=H(x) Neither function can be the parent/ identity function

  3. algebra

    Which statements are true of functions? Check all that apply. All functions have a dependent variable. All functions have an independent variable. The range of a function includes its domain. A vertical line is an example of a

  4. Mathematics

    Suppose that the functions p and q are defined as follows. p (x) = -x 2 q (x) = -2x +2 Find the following. (p×q)(-5) (q ×p)(-5)

  1. Algebra 2

    Answers to the Inverse Relations and Functions Practice, cause I couldn't find it anywhere. 1. A relation is given in the table below. Write out the ordered pair for the inverse, and then determine is the inverse is a function. B)

  2. Math, Still Need Help!

    Label each statement TRUE or FALSE. a. The sum of two one-to-one functions is one-to-one. b. The product of two one-to-one functions is one-to-one. c. If f is a one-to-one function and k is a real number (constant), then the

  3. Precalculus

    The application of one function followed by the application of a second function to the result of the first as in F^-1(f(x)) is called composition of functions. The two functions need not be inverse of each other. In a diagram,

  4. Mathematics

    Choose any two specific functions (not already chosen by a classmate) that have inverses. Use your chosen functions to answer any one of the following questions: If the inverses of two functions are both functions, will the

  1. Mathematics

    Choose any two specific functions (not already chosen by a classmate) that have inverses. Use your chosen functions to answer any one of the following questions. If the inverses of two functions are both functions, will the

  2. calculus

    Choose any two specific functions (not already chosen by a classmate) that have inverses. Use your chosen functions to answer any one of the following questions: If the inverses of two functions are both functions, will the

  3. math

    Choose any two specific functions (not already chosen by a classmate) that have inverses. Use your chosen functions to answer any one of the following questions: If the inverses of two functions are both functions, will the

  4. Algebra

    What similarities and differences do you see between functions and linear equations studied in Ch. 3? Are all linear equations functions? Is there an instance when a linear equation is not a function? Support your answer. Create

Still need help? You can ask a new question.